1. Suppose you want to find the absolute maximum and absolute minimum values of h(x)=x-x? -9x...
Provide an appropriate response. Find the absolute maximum and minimum values offlx)-9x 3-108x 2 + 405x-437 on the interval [-2,7]. O max fx) (1) 4361 min fix) -f(-6) -49 0 max f(x)-13)-49 min f(x) -f(-2) 1751 0 max f(x) = f(7) = 193 min f(x) - f(-2) - -1751 fo) -f-6)- -4361 || O max fx)-(6) = 4361 min f(x) = f(1) = 49
1. Find the absolute maximum and absolute minimum values of the given functions on the given intervals. You do not need to explain your solution with sentences (a) u(z) = er_ 2x on the interval [0, 1]. (b) h(x)- on the interval [0, 3]. Note that you will have to use a logarithmic derivative (as we have done in class) to compute h'(x). You might need a table to compute h(O0) 1. Find the absolute maximum and absolute minimum values...
3. (12 pts) Find the absolute maximum and absolute minimum of f(x) x3 3x2-9x -4 on the interval [0, 4]. 12 AT 4. (10 pts) Sketch the graph of a function f(x) which has the following characteristics: (2) 1, f(5) 5, lim f(), i f)1, m끊f(x)-1, and limo f(x) = 4. 3. (12 pts) Find the absolute maximum and absolute minimum of f(x) x3 3x2-9x -4 on the interval [0, 4]. 12 AT 4. (10 pts) Sketch the graph of...
(1 point) Find the absolute maximum and absolute minimum values of the function 8 f(x) = =*+ 2 on the interval (0.5,5). Enter - 1000 for any absolute extrema that does not exist. Absolute maximum = Absolute minimum =
3. Find the absolute maximum and absolute minimum values of f(x) = x + on the interval [3,4].
(1 point) Find the absolute maximum and absolute minimum values of the function 6x f(x) = 4x + 4 on the interval [2,6]. Enter -1000 for any absolute extrema that does not exist. Absolute maximum = Absolute minimum =
Let f(x)=x^3−(3/2)x^2 on the interval [−1,2]. Find the absolute maximum and absolute minimum of f(x) on this interval. The absolute max occurs at x= . The absolute min occurs at
Find the absolute maximum and absolute minimum values of f on the given interval. f(x) = xe^-2/18, [-2, 6] absolute minimum value absolute maximum value
Find the absolute maximum and absolute minimum values of the function, if they exist, on the indicated interval. f(x) = x2 - 4x + 10; [-2,4] O A. Absolute maximum is 22; absolute minimum is 10 OB. Absolute maximum is 10; absolute minimum is 6 OC. Absolute maximum is 22; absolute minimum is 6 OD. There are no absolute extrema.
5. Find the absolute maximum and absolute minimum values of the function f(x) = x.elfm) on the interval --2 < < 2. J 17 J 3.1.